Filters in Strong BI-Algebras and Residuated Pseudo-SBI-Algebras

Zhang, Xiao­hong; Ma, Xiangyu; Wang, Xuejiao

doi:10.3390/math8091513

Cited by 4 publications

(2 citation statements)

References 23 publications

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“…In general, this paper discusses the relationship between (hyper) logical algebra and classical abstract algebra, and the description of the structure of (hyper) logical algebra is more clear. As a further research topic, we can consider exploring the internal connections between (hyper) BCI-algebras, BI-algebras and CA-semihypergroups (see [36][37][38]).…”

Section: Discussionmentioning

confidence: 99%

A Class of BCI-Algebra and Quasi-Hyper BCI-Algebra

Zhang

2022

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In this paper, we study the connection between generalized quasi-left alter BCI-algebra and commutative Clifford semigroup by introducing the concept of an adjoint semigroup. We introduce QM-BCI algebra, in which every element is a quasi-minimal element, and prove that each QM-BCI algebra is equivalent to generalized quasi-left alter BCI-algebra. Then, we introduce the notion of generalized quasi-left alter-hyper BCI-algebra and prove that every generalized quasi-left alter-hyper BCI-algebra is a generalized quasi-left alter BCI-algebra. Next, we propose a new notion of quasi-hyper BCI algebra and discuss the relationship among them. Moreover, we study the subalgebras of quasi-hyper BCI algebra and the relationships between Hv-group and quasi-hyper BCI-algebra, hypergroup and quasi-hyper BCI-algebra. Finally, we propose the concept of a generalized quasi-left alter quasi-hyper BCI algebra and QM-quasi hyper BCI-algebra and discuss the relationships between them and related BCI-algebra.

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Section: Discussionmentioning

confidence: 99%

A Class of BCI-Algebra and Quasi-Hyper BCI-Algebra

Zhang

2022

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“…Filters, in general, provide accurate keys to locate elements that are large enough to perform some measures which are beneficial in general topology, firstly studied by Cartan in [2], in logic, studied by Tarski, Moisil and others, many of whose results are found in Birkhoff's Lattice Theory in [3]. Relying on several theory-based investigators who dealt with filters, such as Xiaohong, Xiangyu and Xuejiao, the connection and ranked notion of many filter concepts were studied in a systematic manner, and the structure they used is especially essential in their studies given in [4]. Lately, many researchers have focused on filters of various algebraic structures.…”

Section: Introductionmentioning

confidence: 99%

On Filters of Bitonic Algebras

Ozbal

2022

Symmetry

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With the deep study in this work, we introduce the concept of filters of a bitonic algebra A. We study some fundamental structures of such determined filters. We also focus on features of filters with respect to homomorphisms. With the help of the idea of upper sets, we investigate basic ideas of filters in a bitonic algebra, and we also state some important theorems related to them. We obtain some relations between filters of bitonic algebras and upper sets. We obtain an equivalent condition of the filters with the help of the notion of upper sets.

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Sheffer stroke operation on L-algebras via an algorithmic approach

Gürsoy,

Öner,

Gürsoy

et al. 2024

Soft Comput

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In this study, we introduce the Sheffer stroke L-algebra and prove some fundamental theorems, propositions and lemmas of Sheffer Stroke L-algebras. The notions of filter and ultrafilter for Sheffer stroke L-algebra are studied. We give subalgebra and normal subset definitions of a Sheffer stroke L-algebras. Moreover, a homomorphism between Sheffer stroke L-algebras is introduced and isomorphism theorems are presented. Finally, we give three new algorithms for Sheffer stroke L-algebras. Thus, it is contributed to researchers on different application areas by presenting an algorithmic approach on this subject, for the first time in the literature.

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Filters in Strong BI-Algebras and Residuated Pseudo-SBI-Algebras

Cited by 4 publications

References 23 publications

A Class of BCI-Algebra and Quasi-Hyper BCI-Algebra

A Class of BCI-Algebra and Quasi-Hyper BCI-Algebra

On Filters of Bitonic Algebras

Sheffer stroke operation on L-algebras via an algorithmic approach

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